Classes of stable three-layer schemes 441- Weighted schemes. In practice the reader frequently encountered the
weighted schemes
T < t = n T < t 0 ,
(63)
y(O) = Yo , y( r) = Y1 ,where y(a-1,0-2) = (J' 1 y + (1 - (]' 1 - (J' 2 )y + (J' 2 y. The accepted view is that
stability and accuracy of the scheme are governed by selection rules for real
numbers (]' 1 and (]' 2. In Section 1 scheme (63) was written in the canonical
form (1), making it possible to recover the operators(64) R = (]'1 + 2 (]'2 A.
Assumming that there exists an inverse operator A-^1 and applying it,
on the same grounds, to both sides of (1) with operators (64), we obtain(65)where~ 2 ~ ~
B yo t + T R Ytt + A Y = <p ,y(O) = Yo ,
T < t = n T < t 0 ,
Y( r) = Y1 ,
A-E - )
~ ~
This implies that constant operators A and R are self-adjoint.
<p= - A-1 <p.On account of Theorem 1 with regard to ( 65) the operator inequalities
hold:(66) R--A= ~ l~ ((]'1+(]'2 --1) E>O
4 2 4for(67) B = A-^1 + ((]' 1 - (]' 2 ) TE> 0 for (]' 1 > (]' 2 and any A(t) > 0.
Theorem 7 If A(t) is a variable positive operator and the conditions
(68)
are fulfilled, then scheme ( 63) is stable and the estimate holds:t'=r